Proof: In AADC, ZADC= 90° given given Seg DB 1 hypt. AC :: BD2 = Х Theorem of geometric mean :: AB u :: AC = AB + BC = U.
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Answer: Proof: In AADC, ZADC= 90° given given Se g DB 1 hypt. AC :: BD2 = Х Theorem of geometric mean :: AB u :: AC = AB + BC = U.
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Answered by
1
Answer:
Given
AB=AC and BD=DC
To prove:
△≅△ADC
Proof:
In △ADB and △ADC, we have
AB=AC (given)
BD=DC (given)
AD=AD (common)
∴ △ADB≅△ADC [By SSS congruence property]
(i) ∠ADB=∠ADC (corresponding parts of the congruent triangles ) ...(1)
Now, ∠ADB+∠ADC=180
o
[∵∠ADB and ∠ADC are on the straight line]
⇒∠ADB+∠ADB=180
o
[from(1)]
⇒2∠ADB=180
o
⇒∠ADB=
2
180
o
=90
o
∴∠ADB=∠ADC=90
o
[from (1)]
(ii) ∠BAD=∠CAD (∵ corresponding parts of the congruent triangles)
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